7.3 Graphing linear equations in two variables (Page 3/3)

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Practice set a

Graph $3 x + y = 3$ using the intercept method.

An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

When $x = 0$ , $y = 3$ ; when $y = 0$ , $x = 1$

A graph of a line passing through two points with coordinates zero, three and one, zero.

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Graphing using any two or more points

The graphs we have constructed so far have been done by finding two particular points, the intercepts. Actually, any two points will do. We chose to use the intercepts because they are usually the easiest to work with. In the next example, we will graph two equations using points other than the intercepts. We’ll use three points, the extra point serving as a check.

Sample set b

$x - 3 y = - 10$ .
We can find three points by choosing three $x -values$ and computing to find the corresponding $y -values$ . We’ll put our results in a table for ease of reading.

Since we are going to choose $x -values$ and then compute to find the corresponding $y -values$ , it will be to our advantage to solve the given equation for $y$ .

$\begin{array}{r} x - 3 y & = & - 10 & Subtract x from both sides . \\ - 3 y & = & - x - 10 & Divide both sides by - 3. \\ y & = & \frac{1}{3} x + \frac{10}{3} \end{array}$

$x$	$y$	$(x, y)$
1	If $x = 1$ , then $y = \frac{1}{3} (1) + \frac{10}{3} = \frac{1}{3} + \frac{10}{3} = \frac{11}{3}$	$(1, \frac{11}{3})$
$- 3$	If $x = - 3$ , then $y = \frac{1}{3} (- 3) + \frac{10}{3} = - 1 + \frac{10}{3} = \frac{7}{3}$	$(- 3, \frac{7}{3})$
3	If $x = 3$ , then $y = \frac{1}{3} (3) + \frac{10}{3} = 1 + \frac{10}{3} = \frac{13}{3}$	$(3, \frac{13}{3})$

Thus, we have the three ordered pairs (points), $(1, \frac{11}{3})$ , $(- 3, \frac{7}{3})$ , $(3, \frac{13}{3})$ . If we wish, we can change the improper fractions to mixed numbers, $(1, 3 \frac{2}{3})$ , $(- 3, 2 \frac{1}{3})$ , $(3, 4 \frac{1}{3})$ .

A graph of a line passing through three points with coordinates negative three, seven over three; one, eleven over three; and three, thirteen over three.

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$4 x + 4 y = 0$

We solve for $y$ .

$\begin{matrix} 4 y & = & - 4 x \\ y & = & - x \end{matrix}$

$x$	$y$	$(x, y)$
0	0	$(0, 0)$
2	$- 2$	$(2, - 2)$
$- 3$	3	$(- 3, 3)$

A graph of a line passing through three points with coordinates negative three, three; zero, zero; and two, negative two.

Notice that the $x -$ and $y -intercepts$ are the same point. Thus the intercept method does not provide enough information to construct this graph.

When an equation is given in the general form $a x + b y = c$ , usually the most efficient approach to constructing the graph is to use the intercept method, when it works.

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Practice set b

Graph the following equations.

$x - 5 y = 5$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

A graph of a line passing through two points with coordinates zero, negative one and five, zero.

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$x + 2 y = 6$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

A graph of a line passing through two points with coordinates zero, three and two, two.

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$2 x + y = 1$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

A graph of a line passing through two points with coordinates zero, one and one, negative one.

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Slanted, horizontal, and vertical lines

In all the graphs we have observed so far, the lines have been slanted. This will always be the case when both variables appear in the equation. If only one variable appears in the equation, then the line will be either vertical or horizontal. To see why, let’s consider a specific case:

Using the general form of a line, $a x + b y = c$ , we can produce an equation with exactly one variable by choosing $a = 0$ , $b = 5$ , and $c = 15$ . The equation $a x + b y = c$ then becomes

$0 x + 5 y = 15$

Since $0 \cdot (any number) = 0$ , the term $0 x$ is $0$ for any number that is chosen for $x$ .

Thus,

$0 x + 5 y = 15$

becomes

$0 + 5 y = 15$

But, $0$ is the additive identity and $0 + 5 y = 5 y$ .

$5 y = 15$

Then, solving for $y$ we get

$y = 3$

This is an equation in which exactly one variable appears.

This means that regardless of which number we choose for $x$ , the corresponding $y -value$ is 3. Since the $y -value$ is always the same as we move from left-to-right through the $x -values$ , the height of the line above the $x -axis$ is always the same (in this case, 3 units). This type of line must be horizontal.

An argument similar to the one above will show that if the only variable that appears is $x$ , we can expect to get a vertical line.

Sample set c

Graph $y = 4$ .
The only variable appearing is $y$ . Regardless of which $x -value$ we choose, the $y -value$ is always 4. All points with a $y -value$ of 4 satisfy the equation. Thus we get a horizontal line 4 unit above the $x -axis$ .

$x$	$y$	$(x, y)$
$- 3$	4	$(- 3, 4)$
$- 2$	4	$(- 2, 4)$
$- 1$	4	$(- 1, 4)$
0	4	$(0, 4)$
1	4	$(1, 4)$
2	4	$(2, 4)$
3	4	$(3, 4)$
4	4	$(4, 4)$

A graph of a line parallel to x-axis passing through a point with coordinates zero, four.

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Graph $x = - 2$ .
The only variable that appears is $x$ . Regardless of which $y -value$ we choose, the $x -value$ will always be $- 2$ . Thus, we get a vertical line two units to the left of the $y -axis$ .

$x$	$y$	$(x, y)$
$- 2$	$- 4$	$(- 2, - 4)$
$- 2$	$- 3$	$(- 2, - 3)$
$- 2$	$- 2$	$(- 2, - 2)$
$- 2$	$- 1$	$(- 2, - 1)$
$- 2$	0	$(- 2, 0)$
$- 2$	1	$(- 2, 1)$
$- 2$	2	$(- 2, 0)$
$- 2$	3	$(- 2, 3)$
$- 2$	4	$(- 2, 4)$

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Practice set c

Graph $y = 2$ .
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

A graph of a line parallel to x axis passing through a point with coordinates zero, two.

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Graph $x = - 4$ .
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

A graph of a line parallel to y axis and passing through a point with coordinates negative four, zero.

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Summarizing our results we can make the following observations:

When a linear equation in two variables is written in the form $a x + b y = c$ , we say it is written in general form .
To graph an equation in general form it is sometimes convenient to use the intercept method.
A linear equation in which both variables appear will graph as a slanted line.
A linear equation in which only one variable appears will graph as either a vertical or horizontal line.

$x = a$ graphs as a vertical line passing through $a$ on the $x -axis$ .
$y = b$ graphs as a horizontal line passing through $b$ on the $y -axis$ .

Exercises

For the following problems, graph the equations.

$- 3 x + y = - 1$
An xy-plane with gridlines, labeled negative five and five on the both axes.

A graph of a line passing through three points with coordinates negative one, negative four; zero, negative one; and one, two.

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$3 x - 2 y = 6$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

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$- 2 x + y = 4$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

A graph of a line passing through two points with coordinates negative two, zero and zero, four.

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$x - 3 y = 5$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

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$2 x - 3 y = 6$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

A graph of a line passing through three points with coordinates negative one, negative eight over three; zero, negative two; and three, zero.

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$2 x + 5 y = 10$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

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$3 (x - y) = 9$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

A graph of a line passing through two points with coordinates three, zero and zero, negative three.

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$- 2 x + 3 y = - 12$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

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$y + x = 1$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

A graph of a line passing through three points with coordinates one, zero; zero, one; and three, negative two.

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$4 y - x - 12 = 0$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

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$2 x - y + 4 = 0$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

A graph of a line passing through two points with coordinates negative two, zero and zero, four.

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$- 2 x + 5 y = 0$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

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$y - 5 x + 4 = 0$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

A graph of a line passing through three points with coordinates zero, negative four; four over five, zero; and two, six.

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$0 x + y = 3$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

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$0 x + 2 y = 2$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

A graph of a line parallel to x-axis and passing through two points with coordinates negative three, one and three, one.

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$0 x + \frac{1}{4} y = 1$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

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$4 x + 0 y = 16$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

A graph of a line parallel to y-axis and passing through three points with coordinates four, zero; four, two; and four, four.

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$\frac{1}{2} x + 0 y = - 1$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

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$\frac{2}{3} x + 0 y = 1$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

$x = \frac{3}{2}$

A graph of a line parallel to y-axis in an xy plane. The line is labeled as ' x equals three over two' and it crosses the x-axis at x equals three over two.

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$y = 3$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

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$y = - 2$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

$y = - 2$

A graph of a line parallel to x-axis in an xy plane. The line is labeled as ' y equals negative two'. The line crosses the y-axis at y equals negative two.

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$- 4 y = 20$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

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$x = - 4$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

A graph of a line parallel to y-axis in an xy plane. The line is labeled as ' x equals negative four'. The line crosses the x-axis at x equals negative four.

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$- 3 x = - 9$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

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$- x + 4 = 0$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

A graph of a line parallel to y-axis in an xy plane. The line is labeled as ' x equals four'. The line crosses the x-axis at x equals four.

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Construct the graph of all the points that have coordinates $(a, a)$ , that is, for each point, the $x -$ and $y -values$ are the same.
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

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Calculator problems

$2.53 x + 4.77 y = 8.45$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

A graph of a line passing through two points with coordinates three point three four, zero and zero, one point seven seven.

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$1.96 x + 2.05 y = 6.55$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

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$4.1 x - 6.6 y = 15.5$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

A graph of a line passing through two points with coordinates three point seven eight, zero and zero, negative two point three five.

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$626.01 x - 506.73 y = 2443.50$
An xy coordinate plane with gridlines, labeled negative five and five on the both axes.

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Exercises for review

( [link] ) Name the property of real numbers that makes $4 + x = x + 4$ a true statement.

commutative property of addition

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( [link] ) Supply the missing word. The absolute value of a number $a$ , denoted $| a |$ , is the from $a$ to $0$ on the number line.

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( [link] ) Find the product $(3 x + 2) (x - 7)$ .

$3 x^{2} - 19 x - 14$

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( [link] ) Solve the equation $3 [3 (x - 2) + 4 x] - 24 = 0$ .

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( [link] ) Supply the missing word. The coordinate axes divide the plane into four equal regions called .

quadrants

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Questions & Answers

how did you get 1640

Noor Reply

If auger is pair are the roots of equation x2+5x-3=0

Peter Reply

Wayne and Dennis like to ride the bike path from Riverside Park to the beach. Dennis’s speed is seven miles per hour faster than Wayne’s speed, so it takes Wayne 2 hours to ride to the beach while it takes Dennis 1.5 hours for the ride. Find the speed of both bikers.

MATTHEW Reply

420

Sharon

from theory: distance [miles] = speed [mph] × time [hours] info #1 speed_Dennis × 1.5 = speed_Wayne × 2 => speed_Wayne = 0.75 × speed_Dennis (i) info #2 speed_Dennis = speed_Wayne + 7 [mph] (ii) use (i) in (ii) => [...] speed_Dennis = 28 mph speed_Wayne = 21 mph

George

Let W be Wayne's speed in miles per hour and D be Dennis's speed in miles per hour. We know that W + 7 = D and W * 2 = D * 1.5. Substituting the first equation into the second: W * 2 = (W + 7) * 1.5 W * 2 = W * 1.5 + 7 * 1.5 0.5 * W = 7 * 1.5 W = 7 * 3 or 21 W is 21 D = W + 7 D = 21 + 7 D = 28

Salma

Devon is 32 32 years older than his son, Milan. The sum of both their ages is 54 54. Using the variables d d and m m to represent the ages of Devon and Milan, respectively, write a system of equations to describe this situation. Enter the equations below, separated by a comma.

Aaron Reply

find product (-6m+6) ( 3m²+4m-3)

SIMRAN Reply

-42m²+60m-18

Salma

what is the solution

bill

how did you arrive at this answer?

bill

-24m+3+3mÁ^2

Susan

i really want to learn

Amira

I only got 42 the rest i don't know how to solve it. Please i need help from anyone to help me improve my solving mathematics please

Amira

Hw did u arrive to this answer.

Aphelele

Bajemah

-6m(3mA²+4m-3)+6(3mA²+4m-3) =-18m²A²-24m²+18m+18mA²+24m-18 Rearrange like items -18m²A²-24m²+42m+18A²-18

Salma

complete the table of valuesfor each given equatio then graph. 1.x+2y=3

Jovelyn Reply

x=3-2y

Salma

y=x+3/2

Salma

Enock

given that (7x-5):(2+4x)=8:7find the value of x

Nandala

3x-12y=18

Kelvin

please why isn't that the 0is in ten thousand place

Grace Reply

please why is it that the 0is in the place of ten thousand

Grace

Send the example to me here and let me see

Stephen

A meditation garden is in the shape of a right triangle, with one leg 7 feet. The length of the hypotenuse is one more than the length of one of the other legs. Find the lengths of the hypotenuse and the other leg

Marry Reply

how far

Abubakar

cool u

Enock

state in which quadrant or on which axis each of the following angles given measure. in standard position would lie 89°

Abegail Reply

hello

BenJay

Method

I am eliacin, I need your help in maths

Rood

how can I help

Sir

hmm can we speak here?

Amoon

however, may I ask you some questions about Algarba?

Amoon

Enock

what the last part of the problem mean?

Roger

The Jones family took a 15 mile canoe ride down the Indian River in three hours. After lunch, the return trip back up the river took five hours. Find the rate, in mph, of the canoe in still water and the rate of the current.

cameron Reply

Shakir works at a computer store. His weekly pay will be either a fixed amount, $925, or $500 plus 12% of his total sales. How much should his total sales be for his variable pay option to exceed the fixed amount of $925.

mahnoor Reply

I'm guessing, but it's somewhere around $4335.00 I think

Lewis

12% of sales will need to exceed 925 - 500, or 425 to exceed fixed amount option. What amount of sales does that equal? 425 ÷ (12÷100) = 3541.67. So the answer is sales greater than 3541.67. Check: Sales = 3542 Commission 12%=425.04 Pay = 500 + 425.04 = 925.04. 925.04 > 925.00

Munster

difference between rational and irrational numbers

Arundhati Reply

When traveling to Great Britain, Bethany exchanged $602 US dollars into £515 British pounds. How many pounds did she receive for each US dollar?

Jakoiya Reply

how to reduced echelon form

Solomon Reply

Jazmine trained for 3 hours on Saturday. She ran 8 miles and then biked 24 miles. Her biking speed is 4 mph faster than her running speed. What is her running speed?

Zack Reply

d=r×t the equation would be 8/r+24/r+4=3 worked out

Sheirtina

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